Geometry test: Properties
In quadrilateral QSTR, diagonals QS and RT intersect at M. Which statement would always prove quadrilateral QRST is a parallelogram?
1. < TQR and < QRS are supplementary 2. QM = SM and QT = RS 3. QR = TS and QT = RS 4. QR = TS and QT II RS answer: 3
In parallelogram ABCD, diagonals AC and BD intersects at E. Which statement proves ABCD is a rectangle?
1. AC = BD 2. AB perpendicular to BD 3. AC perpendicular to BD 4. AC bisects < BCD answer: 1
In parallelogram ABCD, diagonals AC and BD intersect at E. Which statement does NOT prove parallelogram ABCD is a rhombus?
1. AC = DB 2. AB = BC 3.AC perpendicular to DB 4. AC bisects <DCB answer: 1
A parallelogram must be a rhombus if its diagonals
1. are congruent 2. bisect each other 3. do not bisect its angles 4. are perpendicular to each other answer: 4
In quadrilateral ABCD each diagonal bisects opposite angles. If m< DAB= 70, then ABCD must be a
1. rectangle 2. trapezoid 3. rhombus 4. square answer: 3
Which quadrilateral has diagonals that always bisects its angles and also bisect each other?
1. rhombus 2. rectangle 3. parallelogram 4. isosceles trapezoid answer: 1
If ABCD is a rectangle find m <ABD. <ABC = (x + 18) and < ADC = (4x - 15)
<ABD = 61
If DEFG is an isosceles trapezoid, HG = 7, EH = 9x + 2, and EG= 16x - 5, find DF
DF = 27
legs are congruent
Isosceles trapezoid
opposite sides are parallel
Parallelogram, rectangle, rhombus, square
If PQRS is an isosceles trapezoid, RSTV is a rhombus RT = 28 and SV = 34, find QP
QP = 22
if QSRT is a square and each side at 18, find RT
RT = 25.5
angles at different bases are supplementary
isosceles Trapezoid
Both sets of base angles are congruent
isosceles trapezoid
opposite sides are congruent
parallelogram, rectangle
diagonals bisect each other
parallelogram, rectangle, rhombus,
diagonals are NOT congruent
parallelogram, rhombus
opposite angles are congruent
parallelogram, rhombus
All angles are right angles
rectangle, square
diagonals are congruent
rectangle, square, isosceles trapezoid
only one set of opposite sides are parallel (bases)
regular trapezoid
all sides are parallel
rhombus and square
consecutive angles are supplementary
rhombus, parallelogram
diagonals are perpendicular
rhombus, square,
